Cohomology classes of conormal bundles of Schubert varieties and Yangian weight functions

Abstract

We consider the conormal bundle of a Schubert variety SI in the cotangent bundle T* Gr of the Grassmannian Gr of k-planes in Cn. This conormal bundle has a fundamental class I in the equivariant cohomology H*T(T* Gr). Here T=(C*)n× C*. The torus (C*)n acts on T* Gr in the standard way and the last factor C* acts by multiplication on fibers of the bundle. We express this fundamental class as a sum YI of the Yangian Y(gl2) weight functions (WJ)J. We describe a relation of YI with the double Schur polynomial [SI]. A modified version of the I classes, named 'I, satisfy an orthogonality relation with respect to an inner product induced by integration on the non-compact manifold T* Gr. This orthogonality is analogous to the well known orthogonality satisfied by the classes of Schubert varieties with respect to integration on Gr. The classes ('I)I form a basis in the suitably localized equivariant cohomology H*T(T* Gr). This basis depends on the choice of the coordinate flag in Cn. We show that the bases corresponding to different coordinate flags are related by the Yangian R-matrix.